We discuss the existence of an upper semicontinuous multi-utility representation of a preorder on a topological space. We then prove that every weakly upper semicontinuous preorder is extended by an upper semicontinuous preorder and use this fact in order to show that every weakly upper semicontinuous preorder on a compact topological space admits a maximal element
Rader's utility representation theorem guarantees the existence of an upper semicontinuous utility f...
Rader's utility representation theorem guarantees the existence of an upper semicontinuous utility f...
Given a compact metric space (X, d), and its Borel σ-algebra Σ, we discuss the existence of a (semi)...
We introduce the concept of quasi upper semicontinuity of a not necessarily total preorder on a top...
We characterize the property according to which every maximal element relative to a preorder on a co...
We discuss the possibility of determining all the maximal elements of a preorder on a compact topolo...
We introduce the concept of quasi upper semicontinuity of a not necessarily total preorder on a topo...
We characterize the possibility of determining all the maximal elements for a preorder on a topologi...
2noWe characterize the possibility of determining all the maximal elements for a preorder on a topol...
We present some sufficient conditions for the existence of a continuous multi-utility representati...
3siThe present paper gives a topological solution to representability problems related to multi-util...
The present paper gives a topological solution to representability problems related to multi-utility...
Rader\u2019s utility representation theorem guarantees the existence of an upper semicontinuous util...
The paper presents a general approach to find conditions which ensure the existence of maximal eleme...
The paper presents a general approach to find conditions which ensure the existence of maximal eleme...
Rader's utility representation theorem guarantees the existence of an upper semicontinuous utility f...
Rader's utility representation theorem guarantees the existence of an upper semicontinuous utility f...
Given a compact metric space (X, d), and its Borel σ-algebra Σ, we discuss the existence of a (semi)...
We introduce the concept of quasi upper semicontinuity of a not necessarily total preorder on a top...
We characterize the property according to which every maximal element relative to a preorder on a co...
We discuss the possibility of determining all the maximal elements of a preorder on a compact topolo...
We introduce the concept of quasi upper semicontinuity of a not necessarily total preorder on a topo...
We characterize the possibility of determining all the maximal elements for a preorder on a topologi...
2noWe characterize the possibility of determining all the maximal elements for a preorder on a topol...
We present some sufficient conditions for the existence of a continuous multi-utility representati...
3siThe present paper gives a topological solution to representability problems related to multi-util...
The present paper gives a topological solution to representability problems related to multi-utility...
Rader\u2019s utility representation theorem guarantees the existence of an upper semicontinuous util...
The paper presents a general approach to find conditions which ensure the existence of maximal eleme...
The paper presents a general approach to find conditions which ensure the existence of maximal eleme...
Rader's utility representation theorem guarantees the existence of an upper semicontinuous utility f...
Rader's utility representation theorem guarantees the existence of an upper semicontinuous utility f...
Given a compact metric space (X, d), and its Borel σ-algebra Σ, we discuss the existence of a (semi)...
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